Let G=(V,E) be a simple, finite and undirected (p,q)-graph with p vertices and q edges. A graph G is Skolem odd difference mean if there exists an injection f:V(G)→{0,1,2,…,p+3q-3} and an induced bijection f∗:E(G)→{1,3,5,…,2q-1} such that each edge uv (with f(u)>f(v)) is labeled with f∗(uv)=f(u)-f(v)2. We say G is Skolem even difference mean if there exists an injection f:V(G)→{0,1,2,…,p+3q-1} and an induced bijection f∗:E(G)→{2,4,6,…,2q} such that each edge uv (with f(u)>f(v)) is labeled with f∗(uv)=f(u)-f(v)2. A graph that admits a Skolem odd (or even) difference mean labeling is called a Skolem odd (or even) difference mean graph. In this paper, first, we construct some new Skolem odd difference mean graphs and then investigate the Skole...